On balanced subfamilies of maximum complement-free families in the middle layer of the Boolean lattice

Abstract

We study balanced subfamilies of the middle layer [2n]n of the Boolean lattice 2[2n]. A family F⊂eq[2n]n is said to be balanced if every element in [2n] appears in the same number of members of F. A balanced subfamily of size 2 is exactly a complementary pair \A,[2n] A\, and therefore a family with no balanced subfamily of size 2 has at most 122nn members. We show that for every k≥ 1 and all sufficiently large n, this maximum size is compatible with delaying the smallest size of a balanced subfamily until 2k+2. More precisely, there exists a family F⊂eq[2n]n of size 122nn with no balanced subfamilies of sizes 2,4,…,2k, but with a balanced subfamily of size 2k+2. The proof is constructive and is obtained by lifting Taylor-Zwicker trade-robust magic-square games to self-dual selectors in the middle layer. This proves a recent conjecture of Moss and Pedersen.